AI-generated summary
The content discusses two methods to prove that 0.99 repeating (0.99…) is equal to 1.
**Method 1:**
Let x = 0.99…
Then, 10x = 9.99…
This can be rewritten as 10x = 9 + x, leading to x = 1.
**Method 2:**
Using the equation 1 = 3 × (1/3), it can be shown that 1 = 3 × (0.33…) which simplifies to 1 = 0.99….
A photo by Bozhin Karaivanov is also included.